Is anybody in here smart enough to solve this?
Is anybody in here smart enough to solve this?
Elijah Thompson
Blake Clark
I'm assuming y' is d(y)/dy. Nonetheless, you have 2 unknowns and 1 equation. This cannot be solved without another given linearly independent equation.
Ian Cooper
y=2, t=1.
Any other questions?
Elijah Richardson
LOL
Luis Hughes
y=1, t=2 is obviously the only correct answer
fuck you
Easton Watson
>differential equations
what are you, a college junior?
Joseph Perez
You are.
I believe in you OP
Kayden Brown
solution is y(t) = c_1 e^(-t^2) + 2 sqrt(π) e^(-t^2) erfi(t)
btw.
>pls don't make yourself look retarded and ask me what erfi is
Gabriel Sanders
y' = 4 - 2ty
y = 4y + ty^2
1 = 4 + ty
-3 = ty
t = -3/y
y' + 2ty = 4
4 - 2ty + 2ty = 4
4 - 2y(-3/y) + 2y(-3/y) = 4
-2y(-3/y) + 2y(-3/y) = 0
6 - 6 = 0
what do i win
Evan Watson
Wow it's almost like t is a variable not any random constant you make up
I'm actually a freshman LOL I'm super smart though I took AP calc in high school and got a 3 on the test
Asher Campbell
>I'm super smart
lol
anyone who says this unironically is 100% a fucking brainlet
Austin Morgan
>I'm super smart
sure buddy
>got a 3
3 on what scale
Jonathan Peterson
then pls tell us what the correct solution was, it's already been posted here.
Let's see who the brainlet is
Josiah Campbell
AP exams are scored out of 5. 3 is literally brainlet tier.
Eli Ramirez
it's out of 5, 3 is just under 50%
David Gonzalez
>being this much of a brainlet
Easton Cruz
I hate this way of writing. If y is a function, and t is the variable, you should write
[math]\forall t, 3y'(t) + 6ty(t) = 12[/math]
You wouldn't have stupid answers as But somehow mathematicians find this rigorous...
Austin Williams
percentile
Ryder Kelly
First order linear ODE?
I could do that in high school.
Integrating factors are for babies.
Luis Adams
Then apologies, my gentleman
Carter Young
no, anyone who knows differential equations would know what OP means. they are just retarded highschoolers who try to look smart.
Tyler Gutierrez
yes there are many of us
Elijah Garcia
3 unknowns* (also y'). Also needs an initial condition (another lin indep equation).
Xavier Murphy
user, isn't a stupid answer, try actually reading it
Mason James
[math]
3y' + 6ty = 12 \\
3\dfrac{dy}{dt} + 6ty = 12 \\
y=4t \\
\dfrac{dy}{dt} = 4\\
t=0
[/math]
Nathan Parker
autism
Angel Morales
so many retards...
At least this guy knows how to enter it into wolfram
Aiden Diaz
Uh its already solved, tardcart
Blake Sullivan
what is the function y(t) then, faggot
Jonathan Long
how the fuck do you get a 3 on that exam
Jose Nelson
Not him but our school accidentally gave us the bc instead of the ab. Still passed lul.
Brandon Martin
didn't even know sequences and series other than how to do a taylor expansion and got a 5 on the BC exam
it was definitely the easiest AP test i took
Adrian James
This is an embarrassing performance by all the anons posting before me.
In any case, here we have an inhomogeneous linear first order ODE. This would indicate that we should use an integrating factor. First, divide by 3:
y' + 2ty = 4
Then, we will try the integrating factor u(t) = e^(integral of 2t) = e^(t^2).
Multiplying through, we get
y'*e^(t^2) + y*2te^(t^2) = 4e^(t^2)
The left hand side is just
(y*e^(t^2))' = 4e^(t^2)
Now we integrate:
y*e^(t^2) + C = integral of 4e^(t^2) (which sadly has not got a closed form)
so if y is a solution, it must be of the form y = (C + integral of 4e^(t^2))*e^(-t^2)
Using initial conditions, C can be determined.
Then, you should plug the answer back in to show that y is indeed a solution (fuck doing that though).
Anthony Johnson
isn't a stupid answer
second line is wrong